I will use Gini mean difference risk measure – the mean of the difference between every possible pair of returns to construct Mean-Gini Efficient Frontier. I will use methods presented in “The Generation of Mean Gini Efficient Sets” by J. Okunev (1991) paper to construct optimal portfolios.

Let x.i, i= 1,…,N be weights of instruments in the portfolio. Let us denote by r.it the return of i-th asset in the time period t for i= 1,…,N and t= 1,…,T. The portfolio’s Gini mean difference (page 5) can be written as:

The Gini efficient frontier is almost identical to Standard deviation efficient frontier, labeled ‘Risk’. This is not a surprise because asset returns that are used in the sample input assumptions are well behaved. The Gini measure of risk would be most appropriate if asset returns contained large outliers.